Fermat-Euler quotients arose from the study of the first case of Fermat's Last Theorem, and have numerous applications in number theory. Recently they were studied from the cryptographic aspects by constructing many pseudorandom binary sequences, whose linear complexities and trace representations were calculated. In this work, we further study their correlation measures by using the approach based on Dirichlet characters, Ramanujan sums and Gauss sums. Our results show that the $4$-order correlation measures of these sequences are very large. Therefore they may not be suggested for cryptography.
翻译:Fermat-Euler 商数来自对Fermat最后一个理论第一起案例的研究,在数字理论中有许多应用。最近,通过建造许多假的二进制序列,从加密方面研究了这些参数,这些序列的线性复杂性和痕量表示都经过计算。在这项工作中,我们通过使用基于Drichlet字符、Ramanujan supers和Gauss calls的方法,进一步研究了这些序列的关联度量。我们的结果表明,这些序列的4美元-级相关度量非常大。因此,不能建议进行加密。